On compressions of self-adjoint extensions of a symmetric linear relation

Abstract

Let A be a symmetric linear relation in the Hilbert space with equal deficiency indices n (A)≤∞. A self-adjoint linear relation A⊃ A in some Hilbert space ⊃ is called an exit space extension of A; such an extension is called finite-codimensional if ()< ∞. We study the compressions C ( A)=P A of exit space extensions A= A*. For a certain class of extensions A we parameterize the compressions C ( A) by means of abstract boundary conditions. This enables us to characterize various properties of C ( A) (in particular, self-adjointness) in terms of the parameter for A in the Krein formula for resolvents. We describe also the compressions of a certain class of finite-codimensional extensions. These results develop the results by A. Dijksma and H. Langer obtained for a densely defined symmetric operator A with finite deficiency indices.